The minimum distance of a code is an important measure of robustness of the code since it provides a means to assess its capability to protect data from errors. Several types of distance can be defined for convolutional codes. Column distances have important characterizations in terms of the generator matrices of the code, but also in terms of its parity check matrices if the code is noncatastrophic. The chapter presents the most important known constructions for maximum distance separable convolutional codes. There are natural connections to automata theory and systems theory, and this was first recognized by J. L. Massey and M. K. Sain in 1967. These connections have always been fruitful in the development of the theory on convolutional c...
AbstractThis article focuses on the characterization of two models of concatenated convolutional cod...
[[abstract]]In this paper, convolutional codes are studied for unequal error protection (UEP) from a...
Maximum distance separable (MDS) convolutional codes are characterized through the property that the...
The minimum distance of a code is an important measure of robustness of the code since it provides a...
A convolutional code can be decomposed into smaller codes if it admits decoupled encoders. In this p...
A maximum distance separable (MDS) block code is a linear code whose distance is maximal among all l...
Many communication systems obtain enhanced performance by using concatenated coding schemes. Turbo c...
A convolutional code can be decomposed into smaller codes if it admits decoupled encoders. In this p...
We discuss about construction of convolutional codes via linear system approach. The main discussion...
Abstract—In this paper the decoding capabilities of convolu-tional codes over the erasure channel ar...
Convolutional codes are essential in a wide range of practical applications due to their efficient n...
Several structural and distance properties of the class of codes are derived and utilized in develop...
In this paper we present the analytical results of the computational requirement for the minimum-dis...
Maximum distance separable (MDS) block codes and MDS 1D convolutional codes are the most robust code...
Convolutional codes are characterized by a trellis structure. Maximum-likelihood decoding is charact...
AbstractThis article focuses on the characterization of two models of concatenated convolutional cod...
[[abstract]]In this paper, convolutional codes are studied for unequal error protection (UEP) from a...
Maximum distance separable (MDS) convolutional codes are characterized through the property that the...
The minimum distance of a code is an important measure of robustness of the code since it provides a...
A convolutional code can be decomposed into smaller codes if it admits decoupled encoders. In this p...
A maximum distance separable (MDS) block code is a linear code whose distance is maximal among all l...
Many communication systems obtain enhanced performance by using concatenated coding schemes. Turbo c...
A convolutional code can be decomposed into smaller codes if it admits decoupled encoders. In this p...
We discuss about construction of convolutional codes via linear system approach. The main discussion...
Abstract—In this paper the decoding capabilities of convolu-tional codes over the erasure channel ar...
Convolutional codes are essential in a wide range of practical applications due to their efficient n...
Several structural and distance properties of the class of codes are derived and utilized in develop...
In this paper we present the analytical results of the computational requirement for the minimum-dis...
Maximum distance separable (MDS) block codes and MDS 1D convolutional codes are the most robust code...
Convolutional codes are characterized by a trellis structure. Maximum-likelihood decoding is charact...
AbstractThis article focuses on the characterization of two models of concatenated convolutional cod...
[[abstract]]In this paper, convolutional codes are studied for unequal error protection (UEP) from a...
Maximum distance separable (MDS) convolutional codes are characterized through the property that the...